Basics for Chain Rule Assignment

Every student that studies mathematics in high school, college, university or any other educational institution more or less consistently is going to encounter a chain rule assignment sooner or later. While we offer you to contact our service to sort out all the problems you may have in this concern, here is some chain rule math homework help in order to let you understand what to expect from this topic.

The chain rule is a formula used to calculate the derivative of a functional composition consisting of two or more functions. The solutions for this kind of tasks is based on the principle that if function f has a derivative in the point x0, and function g has a derivative in the point has a derivative in the point y0 = f(x0), then the composite function h(x) = g(f(x)) has a derivative in the point x0 as well.

Solving a chain rule assignment usually involves the usage of one of the general formulas. For example, Leibniz, who is generally considered to be the inventor of the chain rule, used the following chain rule formula for calculating the derivative of a function y = y(x) where x = x(t): dy/dt=(dy/dx)*(dx/dt). However, Leibniz didn’t consider it to be a separate rule in its own right. In integration there is a counterpart of the chain rule that is called the substitution rule.

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